%---------------------------Shape and Size-----------------------------
\section{Shape and Size\label{s:tet-shape-and-size}}

Let $S$ be the shape as defined in \S\ref{s:tet-shape}
and $R$ be the relative size squared as defined in \S\ref{s:tet-rel-size-squared}.
Then the shape and size metric is
\begin{displaymath}
q = S R
\end{displaymath}

\tetmetrictable{shape and size}%
{$1$}%                                        Dimension
{$[0.2,1]$}%                                  Acceptable range
{$[0,1]$}%                                    Normal range
{$[0,1]$}%                                    Full range
{Dependent on $\overline{V}$}%                Equilateral tet
{\cite{knu:03}}%                              Citation
{v\_tet\_shape\_and\_size}%                            Verdict function name

